Certain families of Polynomials arising in the study of hyperelliptic Lie algebras

Abstract

The associative ring R(P(t))= C[t1,u \,|\, u2=P(t)], where P(t)=Σi=0naiti=Πk=1n(t-αi) with αi∈ C pairwise distinct, is the coordinate ring of a hyperelliptic curve. The Lie algebra R(P(t))=Der(R(P(t))) of derivations is called the hyperelliptic Lie algebra associated to P(t). In this paper we describe the universal central extension of Der(R(P(t))) in terms of certain families of polynomials which in a particular case are associated Legendre polynomials. Moreover we describe certain families of polynomials that arise in the study of the group of units for the ring R(P(t)) where P(t)=t4-2bt2+1. In this study pairs of Chebychev polynomials (Un,Tn) arise as particular cases of a pairs (rn,sn) with rn+snP(t) a unit in R(P(t)). We explicitly describe these polynomial pairs as coefficients of certain generating functions and show certain of these polynomials satisfy particular second order linear differential equations.